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Lets say I have a number like 0x448. In binary this is 0100 0100 1000.

How do I set the bits 1, 2 and 3 to either all 0's or all 1's using bit-wise operations? When I say the first three, I'm counting the rightmost bit as the zero bit.

So, for example

Bits as 1's:

b12            b0 
  0100 0100 1110

Bits as 0's:

b12            b0
  0100 0100 0000

I'm guessing that to set them to 1's I use bit-wise OR with a mask of 14 (0x000e)? But if that is the case, how do I do something similar for clearing the bits?


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Your description of "first" bit is ambiguous. Are you referring to the Most Significant or Least Significant bits? – staticsan Apr 15 '09 at 4:00
From some of your comments it seems like you are having a hard time determining which mask number corresponds with which binary digits. Is that correct? – Steve Rowe Apr 15 '09 at 5:15
@Mithrax et al: I formatted the question and (hopefully) clarified it a little. – paxdiablo Apr 15 '09 at 6:18
up vote 14 down vote accepted

You have the bit setting correct: OR with the mask of the bits you want to set.

Bit clearing bits is very similar: AND with the ones-complement of the bits you want cleared.

Example: Word of 0x0448.

Settings bits 1, 2 and 3 would be Word OR 0x000e:

    0000 0100 0100 1000 = 0x0448
 OR 0000 0000 0000 1110 = 0x000e
    ---- ---- ---- ----
  = 0000 0100 0100 1110 = 0x044e

Clearing bits 1, 2 and 3 would be Word AND 0xfff1:

    0000 0100 0100 1000 = 0x0448
AND 1111 1111 1111 0001 = 0xfff1
    ---- ---- ---- ----
  = 0000 0100 0100 0000 = 0x0440

Elaborating on the ones-complement, the AND pattern for clearing is the logical NOT of the OR pattern for setting (each bit reveresed):

 OR 0000 0000 0000 1110 = 0x000e
AND 1111 1111 1111 0001 = 0xfff1

so you can use your favorite language NOT operation instead of having to figure out both values.

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@staticsan, I expanded with the bit operations to make it clearer, then +1'ed you since the answer is now so much better :-) Hope you don't mind. – paxdiablo Apr 15 '09 at 6:07

Supposing you have a mask m with bits set to 1 for all the bits you want to set or clear, and 0 otherwise:

  • clear bits: x & (~m)
  • set bits: x | m
  • flip bits: x ^ m

If you are only interested in one bit, in position p (starting at 0), the mask is simple to express m = 1 << p

Note that I am using C-style conventions, where:

  • ~ is the 1-complement: ~10001010 = 01110101
  • & is the bitwise AND
  • | is the bitwise OR
  • ^ is the bitwise XOR
  • << is the left bit shift: 10001010 << 2 = 00101000
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@Varkhan, I think you mean ~ is the ones-complement. Twos-complement of n is -n (~n + 1 from memory). – paxdiablo Apr 15 '09 at 6:09
@Pax Oops... typo... fixed. – Varkhan Apr 15 '09 at 15:52

OR with 1 is always true; AND with 0 is always false. :)

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Right, but what would my mask be? 0x0000? Do you see what I mean? When doing AND I need to have a mask, how do I specify zero's with just those positions as zero? – Mithrax Apr 15 '09 at 3:57
If you want to keep what you have there do AND with 1, if you want to erase what you have there, AND with 0. – JP Alioto Apr 15 '09 at 4:32

Assuming your OR 0x14 is correct, clearing would be:

AND (NOT 0x14)

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The 0x14 wasn't correct BTW, it was 14 (0xe). – paxdiablo Apr 15 '09 at 6:19

for clearing the bits use AND with 0x440

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That would work with 0x0448 but not any other number - you need 0xfff1 to leave all the other bits untouched. – paxdiablo Apr 15 '09 at 6:11
number &= ~0xe
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Yeah. Too bad there's no 'n' literal modifier. – chaos Apr 15 '09 at 14:09

Lets make sure that bits are counted from 0 starting at the right side or least significant bit and going left. Then observe this: 1 <

 1 <<3     = 00001000

 1 <<p - 1 puts 1 at all positions up to p, exclusive 
 1 <<3-1=00000111

The last step produced a mask to clear bits from the most significant to p inclusive. You can invert it with tilda to clear the other half. Hope this helps.

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